SOLUTION: My son couldn't get these homework problem (even using text) and teacher didn't have time to review in class. QUESTION A librarian bought 10 library books for a total of $138.62;

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Question 29706: My son couldn't get these homework problem (even using text) and teacher didn't have time to review in class. QUESTION A librarian bought 10 library books for a total of $138.62; how many at $12.95 and how many at $15.99? This was a "real life problem" in a 7th grade unit on decimals and percents. ALSO, QUESTION Play tickets were $6 per adult and $4 per child. If $960 total sales were for 180 tickets, how many were adult?
Found 2 solutions by askmemath, AnlytcPhil:
Answer by askmemath(368) (Show Source):
You can put this solution on YOUR website!
Let X books be bough for 12.95 each
Total =12.95X
Then 10-X books were bought for 15.99 each
Total = 15.99(10-X)
Grand total = 138.62
i.e. 12.95X+15.99(10-X) = 138.62
12.95X + 159.9 -15.99X = 138.62
I hope your son can solve from here. You have to follow a similar approach for the next problem as well .
Come back with a repost if you get stuck anywhere.

Answer by AnlytcPhil(1806) (Show Source):
You can put this solution on YOUR website!

A librarian bought 10 library books for a total of $138.62; how many at $12.95 and how many at $15.99? There are two ways to work it. FIRST WAY (using one unknown) Let x = the number bought at $12.95 and 10-x be the number bought at $15.99 Then Total money spent for the x books at $12.95 each, [or 12.95x dollars] PLUS Total money spent for the 10-x at $15.99 each, [or 15.99(10-x) dollars] EQUALS Total money spent for all the books, [or 138.62 dollars] 12.95x + 15.99(10-x) = 138.62 Remove the decimals by multiplying through by 100 1295x + 1599(10-x) = 13862 Remove the parentheses using the distributive principle 1295x + 15990 - 1599x = 13862 Combine the two x-terms on the left -304x + 15990 = 13862 Subtract 15990 from both sides -304x = 13862 - 15990 -304x = -2128 Divide both sides by -304 x = (-2128)/(-304) x = 7 So x = 7 is the number bought at $12.95 each. Then substitute 7 for x in 10-x to find that 10-7 or 3 books were bought ar $15.99. ------------------------------- SECOND WAY (using two unknowns) Let x = the number bought at $12.95 and y be the number bought at $15.99 Then the first equation coms from: Number of $12.95 books [or s] PLUS Number of $15.99 books [or y] EQUALS Total number of books [or 10] So the first equation is X + y = 10 Then, Total money spent for the x books at $12.95 each, [or 12.95x dollars] PLUS Total money spent for the 10-x at $15.99 each, [or 15.99y dollars] EQUALS Total money spent for all the books, [or 138.62 dollars] 12.95x + 15.99y = 138.62 So we have the system of two equations in two unknowns x + y = 10 12.95x + 15.99y = 138.62 Solve that system and get x=7, y=3. -------------------------------------- Play tickets were $6 per adult and $4 per child. If $960 total sales were for 180 tickets, how many were adult? That's the same problem except put $6 and $4 in place of $12.95 and $15.99, 180 in place of 10 and $960 in place of $138.62 6x + 4(180-x) = 960 Solve that and get 120 adult tickets and 60 children tickets. Edwin AnlytcPhil@aol.com